Decision Making in the Arrow of Time.

We show that the steady-state entropy production rate of a stochastic process is inversely proportional to the minimal time needed to decide on the direction of the arrow of time. Here we apply Wald's sequential probability ratio test to optimally decide on the direction of time's arrow in stationary Markov processes. Furthermore, the steady-state entropy production rate can be estimated using mean first-passage times of suitable physical variables. We derive a first-passage time fluctuation theorem which implies that the decision time distributions for correct and wrong decisions are equal. Our results are illustrated by numerical simulations of two simple examples of nonequilibrium processes.

[1]  Jorge Kurchan,et al.  Fluctuation theorem for stochastic dynamics , 1998 .

[2]  Prost,et al.  Asymmetric pumping of particles. , 1994, Physical review letters.

[3]  C. Maes,et al.  Time-Reversal and Entropy , 2002, cond-mat/0202501.

[4]  J. Stoyanov A Guide to First‐passage Processes , 2003 .

[5]  É. Roldán Irreversibility and Dissipation in Microscopic Systems , 2014 .

[6]  J. Lebowitz,et al.  A Gallavotti–Cohen-Type Symmetry in the Large Deviation Functional for Stochastic Dynamics , 1998, cond-mat/9811220.

[7]  Udo Seifert Entropy production along a stochastic trajectory and an integral fluctuation theorem. , 2005, Physical review letters.

[8]  C. Jarzynski Equalities and Inequalities: Irreversibility and the Second Law of Thermodynamics at the Nanoscale , 2011 .

[9]  P Gaspard,et al.  Entropy production and time asymmetry in nonequilibrium fluctuations. , 2007, Physical review letters.

[10]  Energy versus information based estimations of dissipation using a pair of magnetic colloidal particles. , 2014, Physical review letters.

[11]  R. M. Phatarfod Sequential analysis of dependent observations. I , 1965 .

[12]  Cohen,et al.  Dynamical Ensembles in Nonequilibrium Statistical Mechanics. , 1994, Physical review letters.

[13]  Evans,et al.  Probability of second law violations in shearing steady states. , 1993, Physical review letters.

[14]  U. Seifert Stochastic thermodynamics, fluctuation theorems and molecular machines , 2012, Reports on progress in physics. Physical Society.

[15]  Ericka Stricklin-Parker,et al.  Ann , 2005 .

[16]  Heinrich Meyr,et al.  Complete statistical description of the phase-error process generated by correlative tracking systems , 1977, IEEE Trans. Inf. Theory.

[17]  Sidney Redner,et al.  A guide to first-passage processes , 2001 .

[18]  A. M. Turing,et al.  Studies in the History of Probability and Statistics. XXXVII A. M. Turing's statistical work in World War II , 1979 .

[19]  H. Seal Studies in the history of probability and statistics , 1977 .

[20]  R. Khan,et al.  Sequential Tests of Statistical Hypotheses. , 1972 .